Estimate the length of each line segment to the nearest tenth of a unit. Explain your reasoning.

[size=150]Use the fact that [math]\sqrt{7}[/math] is a solution to the equation [math]x^2=7[/math] to find a decimal approximation of [math]\sqrt{7}[/math] whose square is between 6.9 and 7.1.[/size]

Each layer of graphene is about 200 picometers, or [math]200\times10^{-12}[/math] meters, thick. How many layers of graphene are there in a 1.6-mm-thick piece of graphite? Express your answer in scientific notation.

[size=150]The model, represented by [math]y=1.5x+1.2[/math], is graphed with the scatter plot. [/size][br][br][img]data:image/png;base64,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[/img][br][br]What does the slope mean in this situation?

Based on the model, how many points will a player have if he has 30 assists?

[size=150]The points [math](12,23)[/math] and [math](14,45)[/math] lie on a line. What is the slope of the line?[/size]